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引用次数: 0
摘要
在本文中,我们从伪环关联方案给出了强正则图的构造,这是对 Fujisaki(2004)给出的两个构造的共同概括。此外,我们还证明了在 m 为奇素的\(q=2^m\)假设下,PGL(2, q)作用于 PG(2, q)中的外线集合所产生的伪环关联方案(称为椭圆方案)满足我们新构造的条件。因此,我们得到了一个新的无穷族,即具有非质数顶点的拉丁正方形强规则图。
Strongly Regular Graphs from Pseudocyclic Association Schemes
In this paper, we give a construction of strongly regular graphs from pseudocyclic association schemes, which is a common generalization of two constructions given by Fujisaki (2004). Furthermore, we prove that the pseudocyclic association scheme arising from the action of PGL(2, q) to the set of exterior lines in PG(2, q), called the elliptic scheme, under the assumption that \(q=2^m\) with m an odd prime satisfies the condition of our new construction. As a consequence, we obtain a new infinite family of strongly regular graphs of Latin square type with non-prime-power number of vertices.
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